| 16.10. | Definition and basic properties of the cycle space and cut space [0.9.1, 0.9.2, 0.9.4]
|
| 18.10. | Duality between circuits and bonds; Tutte's theorem [0.9.3, 2.1.2, 2.1.3, 0.9.3, 0.9.5, 2.2.6]
|
| 23.20. | Various characterisations of planarity [3.5, 3.6]
|
| 25.10. | Tree packing and covering [1.4]
|
| 30.10. | The Erdős-Pósa theorem; introduction to flows [1.3, 5.1]
|
| 1.11. | Group-valued flows [5.3]
|
| 6.11. | k-flows for small k [5.4, 5.5.1]
|
| 8.11. | Flows and colourings; 6-flows [5.5.2, 5.5.6, 5.6]
|
| 13.11. | The structure theorem of Gallai and Edmonds [1.2.3]
|
| 15.11. | The theorem of Thomas and Wollan I [6.2.3, 2.5.4]
|
| 20.11. | The theorem of Thomas and Wollan II [2.5.3]
|
| 22.11. | The theorem of Erdős and Stone from the regularity lemma [6.1.2]
|
| 27.11. | Proof of the regularity lemma [7.4 in the English edition]
|
| 29.11. | The theorem of Chvátal, Rödl, Szemerédi and Trotter [6.4.2, 6.4.3, 7.2.2]
|
| 04.12. | The induced Ramsey theorem I [7.3.1-7.3.3]
|
| 06.12. | The induded Ramsey theorem II [second proof of 7.3.1]
|
| 11.12. | Third proof of the induced Ramsey theorem; Perfect graphs I [4.5.1,4.5.2]
|
| 13.12. | Perfect graphs II [4.5.3-4.5.6]
|
| 18.12. | The Erdős-Hajnal conjecture.
|
| 20.12. | Fleischner's theorem [8.3]
|
| 8.1. | Wellquasiorders and Kruskal's theorem [10.1,10.2]
|
| 10.1. | Tree decompositions [10.3]
|
| 15.1. | Brambles [10.4]
|
| 17.1. | Forbidden minors and the Erdős-Pósa property [10.6]
|
| 22.1. | The grid theorem I
|
| 24.1. | The grid theorem II
|
